International audienceThis monograph gives a complete overview on the subject of nonconservative stability from the modern point of view. Relevant mathematical concepts are presented, as well as rigorous stability results and numerous classical and contemporary examples from mechanics and physics.It deals with both finite- and infinite-dimensional nonconservative systems and covers the fundamentals of the theory, including such topics as Lyapunov stability and linear stability analysis, Hamiltonian and gyroscopic systems, reversible and circulatory systems, influence of structure of forces on stability, and dissipation-induced instabilities, as well as concrete physical problems, including perturbative techniques for nonself-adjoint boundar...
After an introductory part on dynamical systems and nonlinear science, the main objective is to stud...
Gyroscopic stabilization of a linear conservative system, which is statically unstable, can be eithe...
Notre travail de doctorat porte sur des questions de stabilité d'une certaine classe de systèmes que...
This work gives a complete overview on the subject of nonconservative stability from the modern poin...
The book offers a unified view on classical results and recent advances in the dynamics of nonconser...
Stability of nonconservative systems is nontrivial already on the linear level, especially, if the s...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Asymptotic stability is examined for a linear potential system perturbed by small gyroscopic, dissip...
Oscillations of a purely gyrostatic system with two degrees of freedom are constituted by elliptic p...
This book shows that the phenomenon of integrability is related not only to Hamiltonian systems, but...
Gyroscopic stabilization of a linear conservative system, which is statically unstable, can be eithe...
Bringing together 18 chapters written by leading experts in dynamical systems, operator theory, part...
The main purpose of developing stability theory is to examine dynamic responses of a system to distu...
After an introductory part on dynamical systems and nonlinear science, the main objective is to stud...
Gyroscopic stabilization of a linear conservative system, which is statically unstable, can be eithe...
Notre travail de doctorat porte sur des questions de stabilité d'une certaine classe de systèmes que...
This work gives a complete overview on the subject of nonconservative stability from the modern poin...
The book offers a unified view on classical results and recent advances in the dynamics of nonconser...
Stability of nonconservative systems is nontrivial already on the linear level, especially, if the s...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Asymptotic stability is examined for a linear potential system perturbed by small gyroscopic, dissip...
Oscillations of a purely gyrostatic system with two degrees of freedom are constituted by elliptic p...
This book shows that the phenomenon of integrability is related not only to Hamiltonian systems, but...
Gyroscopic stabilization of a linear conservative system, which is statically unstable, can be eithe...
Bringing together 18 chapters written by leading experts in dynamical systems, operator theory, part...
The main purpose of developing stability theory is to examine dynamic responses of a system to distu...
After an introductory part on dynamical systems and nonlinear science, the main objective is to stud...
Gyroscopic stabilization of a linear conservative system, which is statically unstable, can be eithe...
Notre travail de doctorat porte sur des questions de stabilité d'une certaine classe de systèmes que...